Respuesta :
Answer:
Therefore the dimensions of the garden is 16 feet by 13 feet.
Step-by-step explanation:
Let the length of the garden be x and the width of the garden be y.
Given that the area of the rectangular garden is 208 square feet.
Therefore,
xy =208
[tex]\Rightarrow y = \frac{208}{x}[/tex]
Again given that,
The garden is to be surrounded on three sides by a brick wall costing $ 8 per feet and the remaining sides by a fence costing $5 per feet.
The perimeter of the rectangle is = 2(length+ breadth)
= 2(x+y)
=2x+2y
The total cost of fence
[tex]C= [ (2x\times 8)+(y\times 8)+(y\times 5)][/tex]
= (16x+ 8y +5y)
[tex]=16x+13y[/tex]
[tex]=16x+\frac{13\times 208}{x}[/tex]
[tex]=16x +\frac{2704}{x}[/tex]
To find the maximum or minimum point, we need to find out [tex]\frac{dC}{dx}[/tex] and set [tex]\frac{dC}{dx}[/tex] =0.
[tex]\frac{dC}{dx}=16 -\frac{2704}{x^2}[/tex]
Then
[tex]16 -\frac{2704}{x^2}=0[/tex]
[tex]\Rightarrow \frac{2704}{x^2}=16[/tex]
[tex]\Rightarrow x^2 =\frac{2704}{16}[/tex]
[tex]\Rightarrow x=\pm \sqrt{169}[/tex]
[tex]\Rightarrow x=\pm 13[/tex]
Again [tex]\frac{d^2C}{dx}= \frac {8112}{x^3}[/tex]
[tex]\therefore\left| \frac{d^2C}{dx}\right |_{x=13}= \frac {8112}{13^3}>0[/tex]
Therefore at x= 13 , the cost is minimum.
Therefore x = 13 feet.
The other side of the garden is [tex]=\frac{208}{13}[/tex] feet = 16 feet.
Therefore the dimensions of the garden is 16 feet by 13 feet.
